In this thesis, we develop and apply finite element methods to problems of div-curl type, mainly from applications in electromagnetics. In particular, we focus on least-squares formulations for problems with singularities, edge elements in eddy current computations, and the implementation of the finite element method. <p />We introduce discontinuous elements in the least-squares finite element method (LSFEM) and enforce continuity and boundary conditions weakly. For this scheme, we prove stability and optimal a priori error estimates for the div-grad and the div-curl problems posed on nonconvex domains. Numerical studies in three dimensions, confirming the theoretical results, are presented. Moreover, combining LSFEM and a Galerkin formulat...
error estimator, adaptive algorithm. Abstract. We present an hp-version for a Galerkin method which ...
We develop and analyze an adaptive hybridized Interior Penalty Discontinuous Galerkin (IPDG-H) metho...
Two of the main aspects in the numerical solution of partial differential equations include accurate...
In this thesis, we develop and apply finite element methods to problems of div-curl type, mainly fro...
Results are presented from eddy current computations using adaptive techniques, based on rigorous a...
In this paper, we consider the div-curl problem posed on nonconvex polyhedral domains. We propose a ...
Edge (or Nédélec) finite elements are theoretically sound and widely used by the compu...
Abstract. We develop and analyze least-squares finite element methods for two complementary div-curl...
A widely used approach for the computation of time-harmonic electromag-netic fields is based on the ...
AbstractWe consider efficient and robust adaptive multigrid and domain decomposition methods for the...
Abstract. In this paper, we develop an adaptive finite element method based on reliable and efficien...
Abstract. The aim of this paper is to analyze a finite element method to solve the low-frequency har...
A new least-squares finite element method is developed for the curl-div magnetostatic problem in Lip...
In Finite Element Methods for solving electromagnetic field problems, the use of Edge Elements has b...
The standard Adaptive Edge Finite Element Method (AEFEM), using first/second family Nédélec edge e...
error estimator, adaptive algorithm. Abstract. We present an hp-version for a Galerkin method which ...
We develop and analyze an adaptive hybridized Interior Penalty Discontinuous Galerkin (IPDG-H) metho...
Two of the main aspects in the numerical solution of partial differential equations include accurate...
In this thesis, we develop and apply finite element methods to problems of div-curl type, mainly fro...
Results are presented from eddy current computations using adaptive techniques, based on rigorous a...
In this paper, we consider the div-curl problem posed on nonconvex polyhedral domains. We propose a ...
Edge (or Nédélec) finite elements are theoretically sound and widely used by the compu...
Abstract. We develop and analyze least-squares finite element methods for two complementary div-curl...
A widely used approach for the computation of time-harmonic electromag-netic fields is based on the ...
AbstractWe consider efficient and robust adaptive multigrid and domain decomposition methods for the...
Abstract. In this paper, we develop an adaptive finite element method based on reliable and efficien...
Abstract. The aim of this paper is to analyze a finite element method to solve the low-frequency har...
A new least-squares finite element method is developed for the curl-div magnetostatic problem in Lip...
In Finite Element Methods for solving electromagnetic field problems, the use of Edge Elements has b...
The standard Adaptive Edge Finite Element Method (AEFEM), using first/second family Nédélec edge e...
error estimator, adaptive algorithm. Abstract. We present an hp-version for a Galerkin method which ...
We develop and analyze an adaptive hybridized Interior Penalty Discontinuous Galerkin (IPDG-H) metho...
Two of the main aspects in the numerical solution of partial differential equations include accurate...